Proof of Nuprl Lemma : member-free-vars-aux

Step * 6 1 1 1 of Lemma member-free-vars-aux

1. [opr] : Type
2. bts : bound-term(opr) List
3. ∀bt:bound-term(opr)
     ((bt ∈ bts)
     ⇒ (∀v:varname(). ∀bnds:varname() List.
           ((v ∈ free-vars-aux(bnds;snd(bt))) ⇐⇒ (v ∈ free-vars-aux([];snd(bt))) ∧ (¬(v ∈ bnds)))))
4. f : opr
5. v : varname()
6. bnds : varname() List
7. l : varname() List
8. y1 : varname() List
9. y2 : term(opr)
10. (<y1, y2> ∈ bts)
11. l = free-vars-aux(rev(y1) + bnds;y2) ∈ (varname() List)
12. (v ∈ l)
13. ∃y@0:bound-term(opr)
     ((y@0 ∈ bts)

     ∧ (free-vars-aux(rev(y1) + [];y2) = let vs,a = y@0 in free-vars-aux(rev(vs) + [];a) ∈ (varname() List)))

⊢ (v ∈ free-vars-aux(rev(y1) + [];y2))
BY
{ (InstHyp [⌜<y1, y2>⌝] 3⋅ THEN Auto) }

1
1. [opr] : Type
2. bts : bound-term(opr) List
3. ∀bt:bound-term(opr)
     ((bt ∈ bts)
     ⇒ (∀v:varname(). ∀bnds:varname() List.
           ((v ∈ free-vars-aux(bnds;snd(bt))) ⇐⇒ (v ∈ free-vars-aux([];snd(bt))) ∧ (¬(v ∈ bnds)))))
4. f : opr
5. v : varname()
6. bnds : varname() List
7. l : varname() List
8. y1 : varname() List
9. y2 : term(opr)
10. (<y1, y2> ∈ bts)
11. l = free-vars-aux(rev(y1) + bnds;y2) ∈ (varname() List)
12. (v ∈ l)
13. ∃y@0:bound-term(opr)
     ((y@0 ∈ bts)

     ∧ (free-vars-aux(rev(y1) + [];y2) = let vs,a = y@0 in free-vars-aux(rev(vs) + [];a) ∈ (varname() List)))

14. ∀v:varname(). ∀bnds:varname() List. ((v ∈ free-vars-aux(bnds;snd(<y1, y2>))) ⇐⇒ (v ∈ free-vars-aux([];snd(<y1, y2>\000C))) ∧ (¬(v ∈ bnds)))
⊢ (v ∈ free-vars-aux(rev(y1) + [];y2))

Latex:

Latex:
1. [opr] : Type 2. bts : bound-term(opr) List 3. \mforall{}bt:bound-term(opr) ((bt \mmember{} bts) {}\mRightarrow{} (\mforall{}v:varname(). \mforall{}bnds:varname() List. ((v \mmember{} free-vars-aux(bnds;snd(bt))) \mLeftarrow{}{}\mRightarrow{} (v \mmember{} free-vars-aux([];snd(bt))) \mwedge{} (\mneg{}(v \mmember{} bnds))))) 4. f : opr 5. v : varname() 6. bnds : varname() List 7. l : varname() List 8. y1 : varname() List 9. y2 : term(opr) 10. (<y1, y2> \mmember{} bts) 11. l = free-vars-aux(rev(y1) + bnds;y2) 12. (v \mmember{} l) 13. \mexists{}y@0:bound-term(opr) ((y@0 \mmember{} bts) \mwedge{} (free-vars-aux(rev(y1) + [];y2) = let vs,a = y@0 in free-vars-aux(rev(vs) + [];a))) \mvdash{} (v \mmember{} free-vars-aux(rev(y1) + [];y2)) By Latex: (InstHyp [\mkleeneopen{}<y1, y2>\mkleeneclose{}] 3\mcdot{} THEN Auto) Home Index